Chapter 5 Graphing and Optimization Section 5 Absolute Maxima and Minima.

Chapter 5

Graphing and Optimization

Section 5

Absolute Maxima and Minima

2Barnett/Ziegler/Byleen Business Calculus 12e

Objectives for Section 5.5 Absolute Maxima and Minima

■ The student will be able to identify absolute maxima and minima.

■ The student will be able to use the second derivative test to classify extrema.


Absolute Maxima and Minima

Definition:

f (c) is an absolute maximum of f if f (c) > f (x) for all x in the domain of f.

f (c) is an absolute minimum of f if f (c) < f (x) for all x in the domain of f.


Example 1

x

xxf

273)(

Find the absolute minimum value of

using a graphing calculator.

Window 0 < x < 20

0 < y < 40.

Using the graph utility

“minimum”

to get x = 3 and y = 18.


Extreme Value Theorem

Theorem 1. (Extreme Value Theorem)

A function f that is continuous on a closed interval [a, b] has both an absolute maximum value and an absolute minimum value on that interval.


Finding Absolute Maximum and Minimum Values

Theorem 2. Absolute extrema (if they exist) must always occur at critical values or at end points.

a. Check to make sure f is continuous over [a, b] .

b. Find the critical values in the interval (a, b).

c. Evaluate f at the end points a and b and at the critical values found in step b.

d. The absolute maximum on [a, b] is the largest of the values found in step c.

e. The absolute minimum on [a, b] is the smallest of the values found in step c.


Example 2

Find the absolute maximum and absolute minimum value of

on [–1, 7].23 6)( xxxf


Example 2

Find the absolute maximum and absolute minimum value of

on [–1, 7].

a. The function is continuous.

b. f ´(x) = 3x2 – 12x = 3x (x – 4). Critical values are 0 and 4.

c. f (–1) = –7, f (0) = 0, f (4) = –32, f (7) = 49

The absolute maximum is 49.

The absolute minimum is –32.

23 6)( xxxf


Second Derivative Test

Theorem 3. Let f be continuous on interval I with only one critical value c in I.

If f ´(c) = 0 and f ´´(c) > 0, then f (c) is the absolute minimum of f on I.

If f ´(c) = 0 and f ´´(c) < 0, then f (c) is the absolute maximum of f on I.


Second Derivative and Extrema

f ´(c) f ´´(c) graph of f is

f (c) is

0 + concave up local minimum

0 – concave down

local maximum

0 0 ? test fails


Find the local maximum and minimum values

of on [–1, 7].

Example 2(continued)

23 6)( xxxf


Find the local maximum and minimum values

of on [–1, 7].

a. f ´(x) = 3x2 – 12x = 3x (x – 4).

f ´´(x) = 6x – 12 = 6 (x – 2)

b. Critical values of 0 and 4.

f ´´(0) = –12, hence f (0) local maximum.

f ´´(4) = 12, hence f (4) local minimum.

Example 2(continued)

23 6)( xxxf


Finding an Absolute Extremum on an Open Interval

Example: Find the absolute minimum value of

f (x) = x + 4/x on (0, ∞).

Solution:

The only critical value in the interval (0, ∞) is x = 2. Since f ´´(2) = 1 > 0, f (2) is the absolute minimum value of f on (0, ∞)

f (x) x 4

x

f (x) 14

x2

x2 4

x2

(x 2)(x 2)

x2 Critical values are 2 and 2

f (x) 8

x3


Summary

■ All continuous functions on closed and bounded intervals have absolute maximum and minimum values.

■ These absolute extrema will be found either at critical values or at end points of the intervals on which the function is defined.

■ Local maxima and minima may also be found using these methods.

Chapter 5 Graphing and Optimization Section 5 Absolute Maxima and Minima.

Documents

Transcript of Chapter 5 Graphing and Optimization Section 5 Absolute Maxima and Minima.